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Chapter 8
Trim, Stability and Control*
8.1 Trim
The general principle of flight with any aircraft is that the aerody-
namic, inertial and gravitational forces and moments about three
mutually perpendicular axes are in balance at all times. In helicopter
steady flight (non-rotating), the balance offorces determines the ori-
entation of the main rotor in space. The balance of moments about
the aircraft centre of gravity (CG) determines the attitude adopted bythe airframe and when this balance is achieved, the helicopter is said
to be trimmed. To a pilot the trim may be hands on or hands off :
in the latter case in addition to zero net forces and moments on the
helicopter the control forces are also zero: these are a function of the
internal control mechanism and will not concern us further, apart
from a brief reference at the end of this section.
In deriving the performance equation for forward flight in Chapter
5 (Equation 5.42), the longitudinal trim equations were used in theirsimplest approximate form (Equations 5.38 and 5.39). They involve
the assumption that the helicopter parasite drag is independent of
fuselage attitude, or alternatively that Equation 5.42 is used with a
particular value of Dp for a particular attitude, which is determined
by solving a moment equation (see Figs 8.2a8.2c and the accom-
panying description below). This procedure is adequate for many per-
formance calculations, which explains why the subject of trim was not
introduced at that earlier stage. For the most accurate performance
calculations, however, a trim analysis programme is needed in which
the six equations of force and moment are solved simultaneously, or
* This chapter makes liberal use of unpublished papers by B. Pitkin, FlightMechanics Specialist, Westland Helicopters.
141
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at least in longitudinal and lateral groups, by iterative procedures such
as Stepniewski and Keys (Vol. II) have described.
Consideration of helicopter moments has not been necessary up to
this point in the book. To go further we need to define the functionsof the horizontal tailplane and vertical fin and the nature ofdirect head
moment.
In steady cruise the function of a tailplane is to provide a pitching
moment to offset that produced by the fuselage and thereby reduce
the net balancing moment which has to be generated by the rotor. The
smaller this balancing moment can be, the less is the potential fatigue
damage on the rotor. In transient conditions the tailplane pitching
moment is stabilizing, as on a fixed-wing aircraft, and offsets the
inherent static instability of the fuselage and to some extent that
of the main rotor. A fixed tailplane setting is often used, although
this is only optimum for one combination of flight condition and CG
location.
A central vertical fin is multi-functional: it generates a stabilizing
yawing moment and also provides a structural mounting for the tail
rotor. The central fin operates in a poor aerodynamic environment,
as a consequence of turbulent wakes from the main and tail rotors
and blanking by the fuselage, but fin effectiveness can be improvedby providing additional fin area near the tips of the horizontal
tailplane.
When the flapping hinge axis is offset from the shaft axis (the
normal condition for a rotor with three or more blades), the cen-
trifugal force on a blade produces (Fig. 8.1) a pitching or rolling
142 Basic Helicopter Aerodynamics
Figure 8.1 Direct rotor moment.
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moment proportional to disc tilt. Known as direct rotor moment, the
effect is large because although the moment arm is small the cen-
trifugal force is large compared with the aerodynamic and inertial
forces. A hingeless rotor produces a direct moment perhaps four timesthat of an articulated rotor for the same disc tilt. Analytically this
would be expressed by according to the flexible element an effective
offset four times the typical 3% to 4% span offset of the articulated
hinge.
Looking now at a number of trim situations, in hover with zero
wind speed the rotor thrust is vertical in the longitudinal plane, with
magnitude equal to the helicopter weight corrected for fuselage down-
wash. For accelerating away from hover the rotor disc must be inclined
forward and the thrust magnitude adjusted so that it is equal to, and
directly opposed to, the vector sum of the weight and the inertial force
due to acceleration. In steady forward flight the disc is inclined
forward and the thrust magnitude is adjusted so that it is equal to,
and directly opposed to, the vector sum of the weight and aerody-
namic drag.
The pitch attitude adopted by the airframe in a given flight condi-
tion depends upon a balance of pitching moments about the CG.
Illustrating firstly without direct rotor moment or tailplane-and-airframe moment, the vector sum of aircraft drag (acting through the
Trim, Stability and Control 143
Figure 8.2 Fuselage attitude in forward flight, a. forward CG; b. aft CG;
c. forward CG with direct head moment.
a
c
b
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CG) and weight must lie in the same straight line as the rotor force.
This direction being fixed in space, the attitude of the fuselage
depends entirely upon the CG position. With reference to Figs 8.2(a)
and 8.2(b) a forward location results in a more nose-down attitudethan an aft location. The effect of a direct rotor moment is illustrated
in Fig. 8.2(c) for a forward CG location. Now the rotor thrust and
resultant force of drag and weight, again equal in magnitude, are not
in direct line but must be parallel, creating a couple which balances
the other moments. A similar situation exists in the case of a net
moment from the tailplane and airframe. For a given forward CG
position, the direct moment makes the fuselage attitude less nose-
down than it would otherwise be. Reverse results apply for an aft CG
position. At high forward speeds, achieving a balanced state may
involve excessive nose-down attitudes unless the tailplane can be made
to supply a sufficient restoring moment.
Turning to the balance of lateral forces, in hover the main rotor
thrust vector must be inclined slightly sideways to produce a force
component balancing the tail rotor thrust. This results in a hovering
attitude tilted two or three degrees to port (Fig. 8.3). In sideways flight
the tilt is modified to balance sideways drag on the helicopter: the
same applies to hovering in a crosswind. In forward flight the optionexists, by sideslipping to starboard, to generate a sideforce on the air-
frame which, at speeds above about 50 knots, will balance the tail
rotor thrust and allow a zero-roll attitude to be held.
144 Basic Helicopter Aerodynamics
Figure 8.3 Lateral tilt in hover.
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With the lateral forces balanced in hover, the projection of the resul-
tant of helicopter weight and tail-rotor thrust will not generally pass
through the main-rotor centre, so a rolling couple is exerted which has
to be balanced out by a direct rotor moment. This moment dependsupon the angle between disc axis and shaft axis and since
the first of these has been determined by the force balance, the
airframe has to adopt a roll attitude to suit. For the usual situation,
in which the line of action of the sideways thrust component is
above that of the tail-rotor thrust, the correction involves the shaft
axis moving closer to the disc axis, that is to say the helicopter hovers
with the fuselage in a small left roll attitude. Positioning the tail rotor
high (close to hub height) minimizes the amount of left roll angle
needed.
Yawing moment balance is provided at all times by selection of the
tail-rotor thrust, which balances the combined effects of main-rotor
torque reaction, airframe aerodynamic yawing moment due to sideslip
and inertial moments present in manoeuvring.
The achievement of balanced forces and moments for a given flight
condition is closely linked with stability. An unstable aircraft theor-
etically cannot be trimmed, because the slightest disturbance, atmos-
pheric or mechanical, will cause it to diverge from the originalcondition. A stable aircraft may be difficult to trim, because although
the combination of control positions for trim exists, over-sensitivity
may make it difficult to introduce any necessary fine adjustments to
the aerodynamic control surfaces.
8.2 Treatment of stability and control
As with a fixed-wing aircraft, both static stability and dynamic
stability contribute to the flying qualities of a helicopter. Static sta-
bility refers to the initial tendency of the aircraft to return to its
trimmed condition following a displacement. Dynamic stability con-
siders the subsequent motion in time, which may consist of a dead-
beat return, an oscillatory return, a no-change motion, an oscillatory
divergence or a non-return divergence; the first two signifying posi-
tive stability, the third neutral stability and the last two negative sta-
bility (instability). A statically unstable motion is also dynamically
unstable but a statically stable motion may be either stable or unsta-
ble dynamically.
The subject of stability and control in totality is a formidable one.
The part played by the rotor is highly complicated, because strictly
Trim, Stability and Control 145
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each blade possesses its own degrees of freedom and makes an indi-
vidual contribution to any disturbed motion. Fortunately, however,
analysis can almost always be made satisfactorily by considering the
behaviour of the rotor as a whole. Even so it is useful to make addi-tional simplifying assumptions: those which pave the way for a clas-
sical analysis, similar to that made for fixed-wing aircraft, come
essentially from the work of Hohenemser1 and Sissingh2 and are the
following:
in disturbed flight the accelerations are small enough not to affect
the rotor response, in other words the rotor reacts in effect instan-
taneously to speed and angular rate changes;
rotor speed remains constant, governed by the engine;
longitudinal and lateral motions are uncoupled so can be treated
independently.
Given these important simplifications, the mathematics of helicopter
stability and control are nevertheless heavy (Bramwell, Chapter 7),
edifying academically but hardly so otherwise, and in practice strongly
dependent upon the computer for results. In this chapter we shall be
content with descriptive accounts, which bring out the physical char-acteristics of the motions involved.
No absolute measure of stability, static or dynamic, can be stipu-
lated for helicopters in general, because flying qualities depend on the
particular blend of natural stability, control and autostabilization.
Also, stability must be assessed in relation to the type of mission to
be performed.
8.3 Static stability
We consider the nature of the initial reaction to various forms of dis-
turbance from equilibrium. Longitudinal and lateral motions are
treated independently. The contributions of the rotor to forces and
moments arise from two sources, variations in magnitude of the rotor
force vector and variations in the inclination of this vector associated
with disc tilt, that is with blade flapping motion.
Incidence disturbance
An upward imposed velocity (for example a gust) increases the inci-
dence of all blades, giving an overall increase in thrust magnitude.
146 Basic Helicopter Aerodynamics
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Away from hover, the dissimilarity in relative airspeed on the advanc-
ing and retreating sides leads to an incremental flapping motion,
which results in a nose-up tilt of the disc. Since the rotor centre lies
above the aircraft CG, the pitching moment caused by the change ofinclination is in a nose-up sense, that is destabilizing and increasingly
so with increase of forward speed. In addition, the change in thrust
magnitude itself generates a moment contribution, the effect of which
depends upon the fore-and-aft location of the CG relative to the rotor
centre. In a practical case, the thrust vector normally passes ahead of
an aft CG location and behind a forward one, so the increase in thrust
magnitude aggravates the destabilizing moment for an aft CG posi-
tion and alleviates it for a forward one. The important characteristic
therefore is a degradation of longitudinal static stability with respect
to incidence, at high forward speed in combination with an aft CG
position. This is also reflected in a degradation of dynamic stability
under the same flight conditions.
It should be noted that these fundamental arguments relate to rigid
blades. With the advent of modern composite materials for blade con-
struction, judicious exploitation of the distribution of inertial, elastic
and aerodynamic loadings allows the possibility of tailoring the blade
aeroelastic characteristics to alleviate the inherently destabilizing fea-tures just described.
Of the other factors contributing to static stability, the fuselage is
normally destabilizing in incidence, a characteristic of all streamlined
three-dimensional bodies. Hinge offset, imparting an effective stiff-
ness, likewise aggravates the incidence instability. The one stabilizing
contribution comes from the horizontal tailplane. Figure 8.4 repre-
sents the total situation diagrammatically. The tailplane compensates
for the inherent instability of the fuselage, leaving the rotor contribu-tions as the determining factors. Of these, the stiffness effect for an
articulated rotor is generally of similar magnitude to the thrust vector
tilt moment. With a hingeless rotor (Section 8.5) the stiffness effect is
much greater.
Forward speed disturbance
An increase in forward speed leads to incremental flapping, resulting
in a change in nose-up disc tilt. The amount of change is reckoned
to be about one degree per 10m/s speed increase, independently of
the flight speed. The thrust vector is effectively inclined rearwards,
supported by the nose-up pitching moment produced, providing
Trim, Stability and Control 147
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a retarding force component and therefore static stability with
respect to forward speed. This characteristic is present in the hoverbut nevertheless contributes to a dynamic instability there (see p. 150).
Speed increase increases the airframe drag and this contributes,
increasingly with initial forward speed, to a positive speed-stability
characteristic for the helicopter, except in the hover.
Angular velocity (pitch or roll rate) disturbance
The effect of a disturbance in angular velocity (pitch or roll) is
complex. In brief, a gyroscopic moment about the flapping hinge
produces a phased flapping response and the disc tilt resulting
from this generates a moment opposing the particular angular
motion. Thus the rotor exhibits damping in both pitch and roll.
Moments arising from non-uniform incidence over the disc lead to
cross-coupling, that is rolling moment due to rate of pitch and vice
versa.
Sideslip disturbance
In a sideslip disturbance, the rotor sees a wind unchanged in
velocity but coming from a different direction. As a result the direc-
148 Basic Helicopter Aerodynamics
Figure 8.4 Contributions to static stability in incidence.
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tion of maximum flapping is rotated through the angle of sideslip
change and this causes a sideways tilt of the rotor away from the wind.
There is therefore a rolling moment opposing the sideslip, corre-
sponding effectively to the dihedral action of a fixed-wing aircraft.In addition the sideslip produces a change in incidence of the tail-
rotor blades, so that the tail rotor acts like a vertical fin providing
weathercock stability.
Yawing disturbance
A disturbance in yaw causes a change of incidence at the tail rotor
and so again produces a fin damping effect, additional to that of theactual aircraft fin. Overall, however, basic directional stability tends
to be poor because of degradation by upstream flow separations and
wake effects.
General conclusion
It is seen from the above descriptions that longitudinal static stability
characteristics are significantly different from, and more complexthan, those of a fixed-wing aircraft, whilst lateral characteristics of
the two types of aircraft are similar, although the forces and moments
arise in different ways.
8.4 Dynamic stability
Analytical process
The mathematical treatment of dynamic stability given by Bramwell
follows the lines of the standard treatment for fixed-wing aircraft.
Wind axes are used, with the X-axis parallel to the flight path, and
the stability derivatives ultimately are fully non-dimensionalized. The
classical format is useful because it is basic in character and displays
essential comparisons prominently. The most notable distinction
which emerges is that whereas with a fixed-wing aircraft, the stability
quartic equation splits into two quadratics, leading to a simple phys-
ical interpretation of the motion, with the helicopter this unfor-
tunately is not so, and as a consequence the calculation of roots
becomes a more complicated process.
Industrial procedures for the helicopter tend to be on rather
different lines. The analysis is generally made with reference to body
Trim, Stability and Control 149
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axes, with origin at the CG. In this way the X-axis remains forward
relative to the airframe, whatever the direction of flight or of relative
airflow. The classical linearization of small perturbations is still
applicable in principle, the necessary inclusion of initial-conditionvelocity components along the body axes representing only a minor
complication. Force and moment contributions from main rotor,
tail rotor, airframe and fixed tail surface are collected along each
body axis, as functions of flow parameters, control angles and flapp-
ing coefficients and are then differentiated with respect to each
independent variable in turn. Modern computational techniques
provide ready solutions to the polynomials. Full non-dimension-
alization of the derivatives is less useful than for fixed-wing aircraft
and a preferred alternative is to normalize the force and moment
derivatives in terms of the helicopter weight and moment of inertia
respectively.
Special case of hover
In hovering flight the uncoupled longitudinal and lateral motions
break down further. Longitudinal motion resolves into an uncou-pled vertical velocity mode and an oscillatory mode coupling
forward velocity and pitch attitude. In a similar manner, lateral
motion breaks down into an uncoupled yaw mode and an oscillatory
mode coupling lateral velocity and roll attitude. Both of these coupled
modes are dynamically unstable. The physical nature of the longi-
tudinal oscillation is illustrated in Fig. 8.5 and can be described as
follows.
Suppose the hovering helicopter was to experience a small forward
velocity as at (a). Incremental flapping creates a nose-up disc tilt,
150 Basic Helicopter Aerodynamics
Figure 8.5 Longitudinal dynamic instability in hover.
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which results in a nose-up pitching moment on the aircraft. This is as
described on p. 147, (the important overall qualification being that
there is no significant aircraft drag force). A nose-up attitude devel-
ops and the backward-inclined thrust opposes the forward motionand eventually arrests it, as at (b). The disc tilt and rotor moment have
now been reduced to zero. A backward swing commences, in which
the disc tilts forward, exerting a nose-down moment, as at (c). A nose-
down attitude develops and the backward movement is ultimately
arrested, as at (d). The helicopter then accelerates forward under the
influence of the forward inclination of thrust and returns to the situ-
ation at (a). Mathematical analysis shows, and experience confirms,
that the motion is dynamically unstable, the amplitude increasing
steadily if the aircraft is left to itself.
This longitudinal divergent mode and its lateral-directional coun-
terpart constitute a fundamental problem of hovering dynamics. They
require constant attention by the pilot, though since both are usually
of low frequency, some degree of instability can generally be allowed.
It remains the situation, however, that hands-off hovering is not
possible unless a helicopter is provided with an appropriate degree of
artificial stability.
8.5 Hingeless rotor
A hingeless rotor flaps in similar manner to an articulated rotor and
both the rotor forces and the flapping derivatives are little different
between the two. Terms expressing hub moments, however, are
increased severalfold with the hingeless rotor so that, as has been said,
compared with the 3% to 4% hinge offset of an articulated rotor, theeffective offset of a hingeless rotor is likely to be 12% to 16% or even
higher. This increased stiffness has an adverse effect on longitudinal
static stability: in particular the pitch instability at high speed is much
more severe (Fig. 8.4). A forward CG position is an alleviating factor,
but in practice the CG position is dominated by role considerations.
The horizontal tailplane can be designed to play a significant part.
Not only is the stabilizing influence a direct function of tailplane
size but also the angular setting to the fuselage affects the pitching
moment balance in trim and can be used to minimize hub moment
over the critical part of the operational flight envelope. Despite this,
however, the stability degradation in high-speed flight normally
remains a dominant feature.
Trim, Stability and Control 151
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8.6 Control
Control characteristics refer to a helicopters ability to respond to
control inputs and so move from one flight condition to another. Theinputs are made, as has been seen, by applying pitch angles to the
rotor blades so as to generate the appropriate forces and moments.
On the main rotor the angles are made up of the collective pitch q0and the longitudinal and lateral cyclic pitch angles B1 and A1 as intro-
duced in Chapter 4. The tail rotor conventionally has only collective
pitch variation, determined by the thrust required for yawing moment
balance.
A word is required here about rate damping. When the helicopter
experiences a rate of pitch, the rotor blades are subjected to gyro-
scopic forces proportional to that rate. A nose-up rotation induces a
download on an advancing blade, leading to nose-down tilt of the
rotor disc. The associated offset of the thrust vector from the aircraft
CG and the direct rotor moment are both in the sense opposing the
helicopter rotation and constitute a damping effect or stabilising
feature. A similar argument applies to the gyroscopic effects of a rate
of roll.
Adequacy of control is formally assessed in two ways, by controlpower and control sensitivity. Control power refers to the maximum
moment that can be generated. Normalizing this in terms of aircraft
moment of inertia, the measure becomes one of initial accelera-
tion produced per unit displacement of the cyclic control stick.
Control sensitivity recognizes the importance of a correlation between
control power and the damping of the resultant motion; the ratio
can be expressed as angular velocity per unit stick displacement.
High control sensitivity means that control power is large relativeto damping, so that a large angular velocity is reached before
the damping moment stabilizes the motion.
The large effective offset of a hingeless rotor conveys both increased
control power and greater inherent damping, resulting in shorter time
constants and crisper response to control inputs. Basic flying charac-
teristics in the hover and at low forward speeds are normally improved
by this, because the more immediate response is valuable to the
pilot for overcoming the unstable oscillatory behaviour described
p. 150.
A mathematical treatment of helicopter response is given by
Bramwell (pp. 231249) and illustrated by typical results for a number
of different control inputs. His results for the normal acceleration
produced by a sudden increase of longitudinal cyclic pitch (B1) in
152 Basic Helicopter Aerodynamics
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forward-level flight at advance ratio 0.3 are reproduced in Fig. 8.6. We
note the more rapid response of the hingeless rotor compared with
the articulated rotor, a response which the equations show to be diver-gent in the absence of a tailplane. Fitting a tailplane reduces the
response rates and in both cases appears to stabilize them after three
or four seconds.
Roll response in hover is another important flying quality, par-
ticularly in relation to manoeuvring near the ground. In an appro-
priate example, Bramwell shows the hingeless helicopter reaching a
constant rate of roll within less than a second, while the articul-
ated version takes three or four seconds to do so. For a given degreeof cyclic pitch, the final roll rates are the same, because the control
power and roll damping differ in roughly the same proportion in the
two aircraft.
Rotor response characteristics can be described more or less
uniquely in terms of a single non-dimensional parameter, the stiffness
number S, defined as
8.1
This expresses the ratio of elastic to aerodynamic flapping moments
on the blade. l is the blade natural flapping frequency, having the
value 1.0 for zero blade offset and related generally to the percentage
offset e by:
S n= -( )l2 1
Trim, Stability and Control 153
Figure 8.6 Calculated rotor response to B1 (after Bramwell).
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8.2
Thus a 4% offset yields a value l = 1.03; for hingeless rotors the
lvalues are generally in the range 1.09 to 1.15. In Equation 8.1, n
is a normalizing inertia number. Some basic rotor characteristics
are shown as functions of stiffness number in Fig. 8.7. Taking the
l2
11
2
1
= -
+
-
e
e
154 Basic Helicopter Aerodynamics
Figure 8.7 Rotor characteristics in terms of stiffness number.
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four parts of the diagram in turn, the following comments can be
made.
(a) Rotors have until now made use of only relatively restricted partsof the inertia/stiffness plane.
(b) In the amount of disc tilt produced on a fixed hovering rotor per
degree of cyclic pitch, articulated and the softer hingeless rotors
are practically identical.
(c) On the phase lag between cyclic pitch application and blade flap-
ping, we observe the standard 90 for an articulated rotor with
zero hinge offset, decreasing with increase of offset, real or effec-
tive, to 1520 lower for a hingeless rotor.
(d) For the low stiffness numbers of articulated rotors, the principal
component of moment about the aircraft CG is likely to be that
produced by thrust vector tilt. Hingeless rotors, however, produce
moments mainly by stiffness; their high hub moment gives good
control for manoeuvring but needs to be minimized for steady
flight, in order to restrict as much as possible hub load fluctua-
tions and vibratory input to the helicopter.
8.7 Autostabilization
In order to make the helicopter a viable operational aircraft, short-
comings in stability and control characteristics generally have to be
made good by use of automatic flight control systems. The com-
plexity of such systems, providing stability augmentation, long-term
datum-holding autopilot functions, automatically executed manoeu-
vres and so on, depends upon the mission task, the failure surviv-ability requirements and of course on the characteristics of the basic
helicopter.
Autostabilization is the response to what is perhaps the commonest
situation, that in which inadequate basic stability is combined with
ample control power. The helicopter is basically flyable but in the
absence of automatic aids, continuous correction by the pilot would
be required a tiring process and in some conditions (such as flying
on instruments) potentially dangerous. The corrective is to utilize
some of the available control power to generate moments propor-
tional to a given motion variable and thereby correct the motion. An
automatic signal is superimposed on the pilots manual input, without
directly affecting it. No signal feeds back to the controls; the pilot
merely experiences the changed flying character.
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Autostabilizing systems have in the past used mechanical devices
integral to the rotor; typical of these are the Bell Stabilizer Bar and
the Lockheed Control Gyro (see Fig. 1.12). Alternatively, devices may
be electromechanical, operating on attitude or rate signals from heli-copter motion sensors. Electric or electronic systems are the more flex-
ible and multipurpose. An example is the attitude holdsystem, which
returns the helicopter always to the attitude commanded, even in the
disturbing environments such as gusty air. Naturally, the more the
stability is augmented in this way, the greater is the attention that has
to be paid to augmenting the control power remaining to the pilot.
The balance is often achieved by giving the pilot direct control over
the attitude datum commanded. The design of a particular system is
governed by the degree of augmentation desired and the total control
power available.
References
1 Hohenemser, K. (1939) Dynamic stability of a helicopter with hingedrotor blades. NACA Tech. Memo. 907.
2 Sissingh, G.J. (1946) Contributions to the dynamic stability of rotarywing aircraft with articulated blades. Air Materiel Command Trans. F-TS-690-RE.
156 Basic Helicopter Aerodynamics